Question

In Exercises 27–32 use the principle of superposition to find a particular solution. Where indicated, solve the initial value problem. 27. y" – 2y' – 3y = 4e3x + e*(cos x – 2 sin x)

Answer 1

ºn V-24-Le*, eº (cosx - 2sinx) soli A.Ei8 m² 2m-320 m² m+m-3=0 mcm-3)+1 (m-3)=0 (m+ 1)(m- 30 -- :3 y gece Now we find particular solution:-) To find Ip we have to solve two ronhornogeneous diffeq. Oy"-2y+3y = 4e32 @y"-2y+3y = e* (COS X-2SinaC) for the diff.eq YP, = Axe 3x yo'=A[3x347e32] .: 4p - 343ce3+ Ae3 => Ypa" 3A[3x34+232] +3A23% yp" - 9Axe 3*+ 342 341 342 33€ ::Up," = 9Axe 3* + 6Ae3* Put these values in QAxce344642327-2(3A%e3%+A 3?) - 30Axe3x)4e 32 942234 +6ae34-6136e9d-ZA 3X_39%e3% 4e35 4 A3 = 463x =) 4 A=4 =) A = 1 ...yp, xe3%

fa d.equ Spa: eCB COS® + C Sing) ..ype = Be cosx + ce since 9P, B[eosx- eºsinz]+[cºsing heäoss? Ypz! : Be cos x - Be si nx+ce sinx+ cecx ypg's B[-e*sina tec053]-B[e cosa+e+sinxe] + [ e sinxte+cos3d+c[-e *sinx+e*cosxe] --Be*sina+Becosx - Betcosx - Besinde + cesih«+ ce cosx-cer sina+ceřsda - - 2Be *sinac + ace* codac put these valug in ② (-2Be Tsinac+2ce4 cosx) - 2 (Be cosc - Bem sinac +cesinde + ce* cosa) - 30 Beºcosx+ ce*sinx) = e^(cosx- 2Siz) | - 2Be" snx + 2ce*cosx - 2seºesx + 2Befsha - 2ce*sing -2ce7c036-3Be cosx-3cesinx = ecosse-ze since

- 5 Becos-3cem sinx = ecosx-2esinze coeff.s e cof :-) -5B=1 B: 115 crops of em Sinoc :-) - 303-2 >> - 9, e^(-3 cosx+3sinx) - - -*cosx + cºsia ina بابا Jp = YP, +4P2 .. Yp = xeste cosx+etsinx